In mathematics, we can have a system of equations to represent the
balance of forces. In mathematical statistics, we can have a
generating function to generate the values of probabilities for
whatever can generate values. We can even add different generating
functions to arrive at unbelievably complex generations of statistical
values.
Each mathematical generating function represents a balance with a
single equation or multiple equations. The equations may represent a
system. Systems of equations may exist within other systems of
equations, so it all gets very complicated very soon.
If we could ever assume that all can be represented mathematically, we
would have an enormous collection of equations. My question is
whether that collection can ever be complete.
If you assume that it can be complete then you may assume that a
balance of forces may exist in some way, or that a statistically
determinable outcome may actually be inherent within the mathematical
representations. This requires an enormous amount of faith in what
can be eventually found if one is ever to set out to find it.
